Szczegóły publikacji
Opis bibliograficzny
Groundstates for magnetic Choquard equations with critical exponential growth / Lixi Wen, Vicenţiu D. RǍDULESCU // Applied Mathematics Letters ; ISSN 0893-9659. — 2022 — vol. 132 art. no. 108153, s. 1–8. — Bibliogr. s. 7–8, Abstr. — Publikacja dostępna online od: 2022-05-11. — V. D. Rǎdulescu - dod. afiliacje: University of Craiova, Craiova, Romania ; China-Romania Research Center in Applied Mathematics, Romania
Autorzy (2)
- Wen Lixi
- AGHRǎdulescu Vicenţiu
Słowa kluczowe
Dane bibliometryczne
| ID BaDAP | 140568 |
|---|---|
| Data dodania do BaDAP | 2022-06-21 |
| Tekst źródłowy | URL |
| DOI | 10.1016/j.aml.2022.108153 |
| Rok publikacji | 2022 |
| Typ publikacji | artykuł w czasopiśmie |
| Otwarty dostęp |  |
| Creative Commons | |
| Czasopismo/seria | Applied Mathematics Letters |
Abstract
This paper is dedicated to show the existence of ground state solution for a magnetic Choquard equation with critical exponential growth. By introducing a Moser type function involving magnetic potential and applying analytical techniques, we surmount the obstacles brought from the magnetic potential which makes it a complex-valued problem and the critical exponential growth nonlinearity which makes it difficult to show the non-vanishing of Cerami sequence. Our methods can be applied to related magnetic elliptic equations.